polygonal angle

简明释义

导线角

英英释义

例句

1.The game designer incorporated polygonal angles 多边形角 in the terrain to make the landscape more realistic.

游戏设计师在地形中加入了多边形角，使景观更加真实。

2.The architect designed a building with several polygonal angles 多边形角 to enhance its aesthetic appeal.

建筑师设计了一座具有多个多边形角的建筑，以增强其美学吸引力。

3.During the construction, we had to ensure that each polygonal angle 多边形角 was precise for structural integrity.

在施工过程中，我们必须确保每个多边形角都精确无误，以保证结构完整性。

4.In geometry class, we learned how to calculate the sum of interior polygonal angles 多边形角 in various shapes.

在几何课上，我们学习了如何计算各种形状内部多边形角的总和。

5.The artist used polygonal angles 多边形角 in her painting to create a sense of depth and perspective.

艺术家在她的画作中使用了多边形角，以创造深度和透视感。

作文

In the study of geometry, understanding various shapes and their properties is crucial. One important concept that often comes up is the notion of an angle, particularly in the context of polygons. A polygonal angle, or 多边形角, refers to the angle formed at a vertex where two sides of a polygon meet. This concept is fundamental when analyzing the characteristics of polygons, which are shapes with three or more straight sides. To delve deeper into the significance of 多边形角, we must first understand what constitutes a polygon. Polygons can be classified into various types, such as triangles, quadrilaterals, pentagons, and so forth. Each type has its own unique set of angles and properties. For instance, a triangle, which is the simplest form of a polygon, has three angles that always sum up to 180 degrees. In contrast, a quadrilateral has four angles that add up to 360 degrees. This difference in angle sums is a direct result of the number of sides and vertices in each shape.The concept of 多边形角 becomes particularly interesting when we consider regular polygons, where all sides and angles are equal. For example, in a regular hexagon, each internal angle measures 120 degrees. Understanding how to calculate these angles is essential for various applications in fields such as architecture, engineering, and computer graphics. By mastering the properties of 多边形角, one can create more complex designs and structures, ensuring they are both aesthetically pleasing and structurally sound.Furthermore, the study of 多边形角 extends beyond basic geometry into more advanced mathematical theories. For example, the exterior angle theorem states that the measure of an exterior angle of a polygon is equal to the sum of the measures of the two opposite interior angles. This theorem is not only a fascinating property of polygons but also serves as a useful tool for solving problems involving polygons in various mathematical contexts.In practical situations, understanding 多边形角 is vital. Architects and engineers frequently use this knowledge to design buildings and bridges. They must consider the angles formed by the joints of materials to ensure stability and safety. Similarly, graphic designers utilize the principles of polygonal angles when creating digital illustrations, ensuring that the shapes they produce are accurate and visually appealing.In conclusion, the concept of 多边形角 is an essential part of geometry that plays a significant role in both theoretical mathematics and practical applications. By comprehending how angles function within polygons, one can gain a greater appreciation for the beauty and complexity of geometric shapes. Whether it is in academic pursuits or real-world applications, the knowledge of 多边形角 is invaluable, highlighting the interconnectedness of mathematics, art, and engineering.